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### High School Mathematics - 210.7 Relation Between the Sides of a Triangle and T-Ratios

 The Law of sines In any triangle, the sides are proportional to the sines of the opposite angles, i.e., a/sin A = b/sin B = c.sin C Proof: Let ABC be any oblique triangle. Draw the altitude CD = h. Two cases are possible; all angles are acute or one angle obtuse. In either case; Sin B = h/a from the first figure h = a sin B From the second figure sin A = h/b h = b sin A Equating the two values of h we get, asin B = bsin A => a/sin A = b/sin B Similarly by drawing perpendicular from A to BC, we can prove that c/sin C = b/sin B Therefore in any triangle a/sin A = b/sin B = c/sin C Relations between three sides and two angles In any triangle, to prove that a = b cos C + c cos B, b = c cos A + a cos C, c = a cos B + b cos A In the first figure we have AD/AC = cos A , hence AD = AC cos A = b cos A DB/BC = cos B, hence DB = BC cos B = a cos B Now, AB = AD + DB = b cos A + a cos B => c = a cos B + b cos A Similarly, we can prove the other relations. The law of cosines The square on any side of a triangle is equal to the sum of the squares on the other two sides minus twice the product of those two sides and the cosine of the included angle, i.e, a2 = b2 + c2 - 2bc cos A b2 = c2 + a2 - 2ca cos B c2 = a2 + b2 - 2ab cos C Proof: Consider any oblique triangle ABC with the altitude CD drawn from the vertex C to the opposite side. From the first figure we have AD = b cos A, CD = b sin A, DB = AB - AD = c-b cos A From figure 2 we have cos A = cos (180 - ang CAD) = -cos CAD = - AD/b => AD = -b cos A; CD = b sin A; DB = DA + AB = c - b cos A Thus in both figures, DB = c - b cos A, CD = b sin A Hence a2 = DB2 + CD2 (Pythagoras theorem) = (c-b cos A)2 + b2 sin 2A => a2 = c2 - 2bc cos A + b2(cos2A + b2Sin2A). Hence a2 = b2 + c2 - 2bc cos A Other results can be proved similarly. Cos A = b2 + c2 - a2/2bc Cos B = c2 + a2 - b2/2ca Cos C = a2 + b2 - c2/2ab Area of a triangle A = s(s-a)(s-b)(s-c)1/2 s = (a+b+c)/2 where a, b and c are sides of the triangle . Directions: Solve the following.

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### High School Mathematics - 210.7 Relation Between the Sides of a Triangle and T-Ratios

 Q 1: In triangle ABC, if b = 6, c = 4, cos A = 1/12, find a31/244.31/2 Q 2: In triangle ABC, a = 8.4 cm, b = 7.6 cm and c = 9.2 cm. Calculate the area of triangle ABC.45 sq cm50 sq. cm30 sq cm Q 3: The angles of a triangle ABC are in AP and b:c = 31/2:21/2. Find angle A.60 degrees45 degrees75 degrees Q 4: In a triangle ABC, a = 2, b = 3 and sin A = 2/3, find angle B.80 degrees75 degrees90 degrees Q 5: In triangle ABC b = 4, c = 6, B = 30o, find sin C.1/24/33/4 Q 6: In triangle ABC, a= 15 cm, B = 68 degrees, C = 43 degrees, find b, c and B.A = 60 degrees, b = 4 cm, c = 9 cmA = 60 degrees, b = 3 cm, c = 7 cmA = 69 degrees, b = 4.89 cm, c = 10.96 cm Q 7: In triangle ABC , if 2 cos A/a + cos B/b + 2 cos C/c = a/bc + b/ca. find angle A90 degrees30 degrees45 degrees Q 8: The sines of the angles of a triangle are in the ratio of 4:5:6, find the ratio of the cosines of the angles.2:3:44:5:212:9:2 Question 9: This question is available to subscribers only! Question 10: This question is available to subscribers only!